Numbers

# Are repeating numbers bigger than non repeating numbers?

###### Wiki User

It kind of depends. for example, if you had 19.999999999 and that went on forever, then you had 19.99 that stopped then the repeating one would be bigger, however if you had 19.9900000000 instead of 19.99, then the repeating one is not bigger.

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## Related Questions

Yes if you mean 0.666...repeating it is bigger than 0.6 non-repeating * * * * * But not if you mean is 0.666... repeating is bigger than 0.67

Non-repeating decimals is not a word but a phrase. Non-repeating decimals are irrational numbers.

Some decimals are non-repeating numbers, and some aren't.

If they are non-terminating and there is a repeating pattern, then they are rational. If they are non-terminating and there is no repeating pattern, as in pi, they are irrational.

If there's a repeating sequence then it's a rational number.

No.0.33333... repeating = 1/30.428571... repeating = 3/70.11111... repeating = 1/90.090909... repeating = 1/11Those decimals are all non-terminating, but the numbers are all rational.

No because non-repeating decimals may be terminating.But suppose you consider terminating decimals as consisting of repeating 0s. That is, 1/8 = 0.125 = 0.12500....Then all non-repeating decimals are irrational.

yes, all numbers except numbers that have non-terminating, non-repeating decimals.

A number is said to be irrational if the number is non -repeating and non-terminating.

Yes, except that all irrational numbers will be non-terminating, non-repeating decimals.

Rational numbers - can be expressed as a fraction, and can be terminating and repeating decimals. Irrational numbers - can't be turned into fractions, and are non-repeating and non-terminating. (like pi)

It is a non-terminating, non-repeating decimal representation. That is a definition of irrational numbers.

Non terminating means that when represented as a decimal, the digits go on forever. In this class there are two types: There are repeating, such as 0.333333... which equals 1/3 and 0.090909.... which equals 1/11. Then there are non-repeating, which go on forever without a repeating pattern. These are the irrational numbers, such as pi, e, and square root of 2.

Rational numbers can be written as a fraction with a non-zero denominator,as a terminating,a decimal,or a repeating decimal.

Irrational numbers are a subset of real numbers which cannot be written in the form of a ratio of two integers. A consequence is that their decimal representation is non-terminating and non-repeating.

There are three main types of decimal numbers:Terminating: these come to an end after a finite number of digits. These are the number 0 and also numbers such that their rational representation in the simplest form has a denominator whose only prime factors are 2 and 5.Repeating: these have a string of digits which repeats without end. The string may start afetr a finite number of non-repeating digits. For example, 2.1346515235235235... has the 3-digit string "235" repeating, but not straight away. These are numbers whose rational representation in the simplest form has a denominator which has a prime factor other than 2 or 5.Non-terminating and non-repeating: these have an endless number of digits with no repeating strings. These digits may be random or may contain patterns, such as 5.12122122212222.... but there cannot be a repeating string. These are irrational numbers.

2, 3.67, -4.585858.. (repeating) are some examples.

Any decimal that can't be expressed as a fraction is an irrational number

Decimal representations of irrational numbers are non-terminating and non-repeating.

A non-repeating decimal is a decimal that never repeats itself. For example, pi is a non-repeating decimal.

All real numbers have a decimal representation. Rational numbers have decimal representations that terminate or repeat infinitely. Irrational numbers have decimal representations that are non-terminating and non-repeating.

A terminating decimal is a rational number. A non-terminating, repeating decimal is a rational number. A non-terminating, non-repeating decimal is an irrational number.

It is an irrational number such as sqrt(2), pi, e. There are, in fact infinitely more irrational numbers than rational ones.

###### Math and ArithmeticPercentages, Fractions, and Decimal ValuesNumbers Irrational NumbersAlgebra

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